Split bridge circuit force sensor

ABSTRACT

A force sensor comprising a beam having a longitudinal axis and a proximal end portion and a distal end portion; a first Wheatstone bridge disposed on a first face of the beam, including multiple tension gauge resistors and multiple compression gauge resistors; a second Wheatstone bridge disposed on the first face of the beam, including multiple tension gauge resistors and multiple compression gauge resistors; wherein at least one tension gauge resistor and at least one compression gauge resistor from each of the first and second Wheatstone bridges is disposed at a proximal end portion of the beam; wherein at least one tension gauge resistor and at least one compression gauge resistor from each of the first and second Wheatstone bridges is disposed at a distal end portion of the beam.

CLAIM OF PRIORITY

This application claims the benefit of priority to U.S. Provisional Patent Application Ser. No. 62/586,721, filed on Nov. 15, 2017, and to U.S. Provisional Patent Application Ser. No. 62/586,166, filed on Nov. 14, 2017, each of which is incorporated by reference herein in its entirety.

BACKGROUND

Force sensing and feedback during a minimally invasive surgical procedure may bring better immersion, realism and intuitiveness to a surgeon performing the procedure. For the best performance of haptics rendering and accuracy, force sensors may be placed on a surgical instrument and as close to the anatomical tissue interaction as possible. One approach is to embed a force sensor at a distal end of a surgical instrument shaft with electrical strain gauges formed on the force transducer, through printing or additive deposition processes, to measure strain imparted to the surgical instrument.

FIG. 1 is an illustrative drawing representing a force sensor that includes a rectangular beam with four full-Wheatstone bridges (full-bridges). A bridge circuit is a circuit topology of electrical circuit in which two circuit branches (usually in parallel with each other) are bridged by a third branch connected between the first two branches at some intermediate point along them. Two full-bridges are formed on each of two adjacent orthogonal side faces of the beam to measure forces orthogonal to a longitudinal axis of the beam. The beam may be secured to a distal portion of a surgical instrument shaft to sense forces orthogonal to a longitudinal axis of the shaft. A forces applied orthogonal to a side face of the beam (i.e. an X or Y force) is determined by subtracting force measurements determined by the full-bridges at proximal and distal end portions of that side face of the beam.

A force sensor may experience a variety of different strain sources including: the orthogonal force of interest to be measured, moment, off axis force, off axis moment, compression/tension, torsion, ambient temperature and gradient temperature. Each of the full-bridges cancels the following stress: temperature, torsion, off axis force, and off axis moment. Each individual full-bridge output indicates stress due to force, moment, and compression/tension. The subtraction of an output value produced by a proximal full-bridge formed on a side face from an output value produced by a distal full-bridge on the same side face, cancels the moment and compression/tension, resoling in an output value that represents the orthogonal force of interest to be measured.

A surgical instrument force sensor may be critical to ensuring patient safety. Accordingly, force sensor error detection may be required to protect against harm by detecting force sensor failures. One approach to error detection may be to provide additional full-bridges to produce redundant force measurements that can be compared to detect errors. However, limited space on beam side faces makes formation of additional full-bridges on a side face impractical. Moreover, a manufacturing process typically is limited to formation of bridges at most on two side faces. Formation of bridges on four side faces would increase manufacturing cost significantly.

SUMMARY

In one aspect, a force sensor includes a beam having a longitudinal axis and a proximal end portion and a distal end portion. A first Wheatstone bridge is disposed on a first face of the beam and includes first and second tension gauge resistors and first and second compression gauge resistors. A second Wheatstone bridge is disposed on the first face of the beam and includes third and fourth tension gauge resistors and third and fourth compression gauge resistors. The first and third tension gauge resistors and the first and third compression gauge resistors are disposed at a proximal end portion of the beam. The second and fourth tension gauge resistors and the second and fourth compression gauge resistors are disposed at a distal end portion of the beam.

In another aspect, a force sensor includes a beam having a longitudinal axis and a proximal end portion and a distal end portion. A first tension gauge half-bridge is disposed on a first face of the beam and includes first and second tension gauge resistors. A second tension gauge half-bridge is disposed on the first face of the beam and includes third and fourth tension gauge resistors. A compression gauge half-bridge is disposed on the first face of the beam and includes first and second compression gauge resistors. The first and third tension gauge resistors and the first compression gauge resistor are disposed at a proximal end portion of the beam. The second and fourth tension gauge resistors and the second compression gauge resistor are disposed at a distal end portion of the beam.

In yet another aspect, a force sensor includes a beam having a longitudinal axis and a proximal end portion and a distal end portion. A first bridge circuit is disposed on a first face of the beam and includes multiple tension gauge resistors and at least one compression gauge resistor. A second bridge circuit is disposed on the first face of the beam and includes multiple tension gauge resistors and at least one compression gauge resistor. The at least one tension resistor from each of the first and second bridge circuits and at least one compression gauge resistor from one of the first and second bridges are disposed at a proximal end portion of the beam. The at least one tension resistor from each of the first and second bridge circuits and at least one compression gauge resistor from one of the other of the first and second bridges are disposed at a distal end portion of the beam.

BRIEF DESCRIPTION OF THE DRAWINGS

In the drawings, which are not necessarily drawn to scale, like numerals may describe similar components in different views. Like numerals having different letter suffixes may represent different instances of similar components. The drawings illustrate generally, by way of example, but not by way of limitation, various embodiments discussed in the present document.

FIG. 1 is an illustrative drawing representing a force sensor that includes a rectangular beam with four full-Wheatstone bridges (full-bridges).

FIG. 2 is an illustrative side elevation view of a distal portion of a surgical instrument with an elongated shaft having a force sensor beam mounted thereon, in accordance with some examples.

FIG. 3 is an illustrative perspective view of a force sensor beam having a beam side face with a pair of split bridge circuits formed thereon.

FIG. 4A is an illustrative schematic diagram representative of a first full-bridge bridge circuit.

FIG. 4B is an illustrative schematic diagram representative of a second full-bridge circuit.

FIG. 5 is an illustrative perspective view of a force sensor beam having a beam side face with a pair of staggered split bridge circuits formed thereon.

FIG. 6 is an illustrative perspective view of a force sensor beam having a beam face side with a pair of interleaved split half-bridge circuits.

FIG. 7 is an illustrative schematic diagram representative of three half-bridge circuits.

FIG. 8 is an illustrative side view of the beam showing arrangement of the gauge sensors of the interleaved three half-bridges example of FIG. 6.

FIG. 9 is an illustrative perspective view of a force sensor beam having a beam face with a pair of staggered split half-bridge circuits.

FIG. 10 is an illustrative side view representing arrangement of the gauge sensors of the staggered three half-bridges example of FIG. 9.

FIG. 11 is an illustrative perspective view of a beam with a T-gauge (tension) and C gauge (compression) disposed along a neutral axis of a beam.

FIG. 12 is an illustrative perspective view of a beam with tension gauges R1 and R2 disposed along a neutral axis of a beam, respectively, at a proximal end portion and at a distal end portion of the beam.

FIG. 13 is an illustrative schematic diagram representing a half-bridge circuit containing R1 and R2 of FIG. 12.

FIG. 14 is an illustrative side view of a force applied to a cantilever beam indicating strain measurement at a distance l from the location where force is applied to the beam.

FIG. 15 is an illustrative side view of a force applied to a cantilever beam indicating strain measurement at a proximal distance and at a distal distance from the location where force is applied to the beam.

FIG. 16 is a side view of a cantilever beam.

FIG. 17A is a side view of a beam with a Wheatstone bridge disposed at a proximal end thereof.

FIG. 17B is a schematic diagram of the Wheatstone bridge circuit of FIG. 17A.

FIG. 18 is a side view of a beam with a split Wheatstone bridge having a tension gauge resistor R1 and a compression gauge resistor R2.

FIG. 19 is an illustrative drawing representing an example force sensor that includes a beam with two split full bridge circuits thereon.

FIG. 20A is an illustrative simplified block diagram showing mechanically isolated lead lines extending between strain gauge elements of two proximal split bridge circuit halves and strain gauge elements of two distal split bridge circuit halves.

FIG. 20B is an illustrative drawing showing certain details of a first example arrangement of the strain gauge elements of the example sensor of FIG. 20A.

FIG. 20C is an illustrative drawing showing certain details of a second example arrangement of the strain gauge elements of the example sensor of FIG. 20A.

FIG. 21 is an illustrative drawing showing a set of proximal connection pads and a set of distal connection pads in which input pads and measurement pads have matching areas.

FIG. 22 is an illustrative drawing showing a set of proximal connection pads and a set of distal connection pads in which measurement pads have larger area than input pads.

FIG. 23 is an illustrative circuit schematic showing a force sensor that includes example first and second split bridge circuits disposed upon a beam that share excitation voltage inputs.

FIG. 24 is an illustrative drawing representing the tap lead lines for the example dual split bridge circuit of FIG. 23.

DETAILED DESCRIPTION

FIG. 2 is an illustrative side elevation view of a distal portion of a surgical instrument 202 with an elongated shaft 204, shown in partially cut-way, having a force sensor beam 206 mounted thereon, in accordance with some examples, The surgical instrument 202 includes an end effector 208, which may include articulatable jaws, for example. During a surgical procedure, the end effector 208 contacts anatomical tissue, which may result in X, Y, or Z direction forces and that may result in moment forces such as a moment M_(Y) about a y-direction axis. The force sensor 206, which includes a longitudinal axis 210, may be used to measure X and Y forces perpendicular to the longitudinal axis 210.

FIG. 3 is an illustrative perspective view of a force sensor beam 206 having a beam side face 212 with a pair of split bridge circuits formed thereon. The bridge circuits are split in that a portion of each bridge circuit is disposed at a proximal end portion of the beam and a portion of the bridge circuit is disposed at a distal end portion of the beam. More particularly, in the example of FIG. 3, the bridge circuits are configured as interleaved split full-Wheatstone bridges (frill-bridges) formed thereon, having strain gauge resistors R_(C1), R_(C3), R_(T1), R_(T3) aligned along a neutral axis (equidistant from the sides of the beam) at a proximal beam end portion 206P and having strain gauge resistors R_(C2), R_(C4), R_(T2), R_(T4) aligned along a neutral axis at a distal beam end portion 206D, in accordance with some examples. An identical pair of interleaved split full-bridges (not shown) is formed on an adjacent orthogonal beam side face 214. The pair of interleaved split full-bridges formed on adjacent orthogonal side faces are configured to measure forces perpendicular to a longitudinal axis 210 of the beam 206, which may impart tensile strain to the beam. It will be appreciated that alignment of the gauge resistors along the neutral axis reduces the effect of off axis load since the neutral axis is insensitive to off axis force and moments

FIG. 4A is an illustrative schematic diagram representative of a first split full-bridge bridge of the pair, which includes a tension-gauge half-bridge comprising tension strain gauge resistors R_(T1) and R_(T2) and includes a compression-gauge half-bridge comprising compression strain gauge resistors R_(C1) and R_(C2), coupled as shown to receive an input voltage V_(in) and to produce a first output voltage V_(O1). FIG. 4B is an illustrative schematic diagram representative of a second split full-bridge of the pair, which includes a tension-gauge half-bridge tension strain gauge resistors R_(T3) and R_(T4) and includes a compression-gauge half-bridge comprising compression strain gauge resistors R_(C3) and R_(C4), coupled as shown receive the input voltage V_(in) and to produce a second output voltage V_(O2).

As explained more fully below, each tension strain gauge resistor R_(T1)-R_(T4) and each compression strain gauge resistor R_(C1)-R_(C4) includes a plurality of elongated resistor portions aligned in parallel and coupled end-to-end to form a serpentine or snake-like configuration. The elongated portions of the compression strain gauge resistors R_(C1)-R_(C4) may be aligned parallel to the longitudinal axis 210 of the beam to sense compression strain upon the beam 206. The elongated portions of the tension strain gauge resistors R_(T1)-R_(T4) may be aligned perpendicular to the longitudinal axis of the beam to sense tension strain upon the beam.

Referring again to FIG. 3, each interleaved split full-bridge has a tension gauge sensor resistor and a compression gauge sensor resistor disposed at the proximal end portion 206P of the beam 206. Each interleaved split full-bridge also has a tension gauge sensor and a compression gauge sensor disposed at the distal end portion 206D of the beam 206. Specifically, strain gauge resistors, R_(T1), R_(T3) R_(C1) and R_(C3) are disposed at the proximal end portion 206P of the beam 206, and strain gauge resistors R_(T2), R_(T4), R_(C2) and R_(C4) are disposed at the distal end portion 206D of the beam 206. Moreover, elongated portions of strain gauge resistor R_(T1) are interleaved with elongated portions of strain gauge resistor R_(T3) so as to be co-located and occupy same longitudinal region of the beam. Elongated portions of strain gauge resistor R_(C1) are interleaved with elongated portions of strain gauge resistor R_(C3) so as to be co-located and occupy same longitudinal region of the beam. The interleaved compression gauge resistors R_(C1), R_(C3) are disposed closer to the proximal end of the beam than the interleaved tension resistors R_(T1), R_(T3). Elongated portions of strain gauge resistor R_(T2) are interleaved with elongated portions of strain gauge resistor R_(T4) so as to be co-located and occupy same longitudinal region of the beam. Elongated portions of strain gauge resistor R_(C3) are interleaved with elongated portions of strain gauge resistor R_(C4) so as to be co-located and occupy same longitudinal region of the beam. The interleaved compression gauge resistors R_(C2), R_(C4) are disposed farther from the distal end of the beam than the interleaved tension resistors R_(T2), R_(T4). The interleaving of strain gauge resistors of the example of FIG. 3 will be better understood from the description with reference to the interleaved half-bridge example represented in the illustrative drawings of FIG. 8.

FIG. 5 is an illustrative perspective view of a force sensor beam 206 having a beam side face 212 with staggered split full-bridges formed thereon, each having strain gauge resistors R_(C1), R_(C3), R_(T1), R_(T3) aligned along a neutral axis at a proximal beam end portion 206P and each having strain gauge resistors R_(C2), R_(C4), R_(T2), R_(T4) aligned along a neutral axis at a distal beam end portion 206D, in accordance with some examples. The beam has four elongated rectangular side faces and rectangular end faces. An identical pair of staggered split full-bridges (not shown) is formed on an adjacent orthogonal beam side face 214. The pair of staggered split full-bridges formed on adjacent orthogonal side faces are configured to measure threes perpendicular to the longitudinal axis of the beam, which may impart tensile strain to the beam.

The illustrative schematic diagrams of FIGS. 4A-4B, described above, are representative of first and second full-bridges of the staggered split full-bridges of FIG. 5. Each staggered split full-bridge has a tension gauge sensor resistor and a compression gauge sensor resistor disposed at the proximal end portion 206P of the beam 206. Each full-bridge also has a tension gauge sensor and a compression gauge sensor disposed at the distal end portion 206D of the beam 206. Specifically, strain gauge resistors, R_(T1), R_(T3) R_(C1) and R_(C3) are disposed at the proximal end portion 206P of the beam 206, and strain gauge resistors R_(T2), R_(T4), R_(C2) and R_(C4) are disposed at the distal end portion 206D of the beam 206. However, unlike the pair of the interleaved split full-bridges of FIG. 3, the split staggered split bridges of FIG. 5 are disposed in a “staggered” arrangement in which pairs of strain gauges of each full-bridge are disposed adjacent to each other at opposite end portions of the beam. Strain gauge resistors R_(T1) and R_(C1) of the first staggered split full-bridge are disposed adjacent to each other at the proximal end portion 206P of the beam 206. Strain gauge resistors R_(T3) and R_(C3) of the second staggered split full-bridge are disposed adjacent to each other at the proximal end portion 206P of the beam 206, offset farther from the proximal end portion 206B than are the strain gauge resistors R_(T1) and R_(C1). Similarly, strain gauge resistors R_(T2) and R_(C2) of the first staggered split full-bridge are disposed adjacent to each other at the distal end portion 206D of the beam 206. Strain gauge resistors R_(T4) and R_(C4) of the second staggered split full-bridge are disposed adjacent to each other at the distal end portion 206D, offset closer to the distal end portion 206D than are the strain gauge resistors R_(T2) and R_(C2).

Both the interleaved split full-bridge and the staggered split full-bridge produce redundant first and second output voltages V_(O1) and V_(O2). The longitudinal distribution of the tension and compression gauge sensor resistors of the pair of interleaved split full-bridges of FIG. 3 and the pair of staggered split full-bridges of FIG. 5 cancels out and substantially removes noise that may be caused by forces from other sources such as off axis load moments in any of three directions and forces in either of the two orthogonal directions to the force being measured. Furthermore, each of the full-bridges of the pair of interleaved split full-bridges and each of the full-bridges of the pair of staggered split full-bridges includes both tension and compression strain gauge resistors configured to substantially cancel the effects of temperature variation. Moreover, the interleaving of these strain gauge resistors in the example of FIG. 3 ensures that they measure strain at the same locations of the beam, which ensures that the redundant first output voltage V_(O1) and second output voltage V_(O2) have matching values even if there are temperature variations along the length of the beam.

Thus, the distribution of gauge sensor resistors of each full-bridge between proximal and distal end portions of the beam removes the effects of noise resulting from other sources of force and cancel the effects of temperature so that the first and second output signals V_(O1) and V_(O2) produce the same redundant value. The first and second output signal values VO1 and V_(O2) may be compared to determine whether they have different values. A determination that V_(O1) and V_(O2) have different values provides an indication of an error due to damage to the force sensor, for example.

FIG. 6 is an illustrative perspective view of a force sensor beam 206 having a beam face 212 with a pair of interleaved split half-Wheatstone bridges (half-bridges) each comprising tensile gauge sensor resistors formed at proximal and distal end portions of the beam 206 and having a shared half-bridge comprising compression gauge resistors formed at proximal and distal end portions of the beam, in accordance with some examples. A first tensile gauge half-bridge includes strain gauge resistor R_(T1) at the proximal end portion 206P and includes strain gauge resistor R_(T2) at the distal end portion 206D. A second tensile gauge half-bridge includes strain gauge resistor R_(T3) at the proximal end portion 206P and includes strain gauge resistor R_(T4) at the distal end portion 206D. The compression gauge half-bridge includes strain gauge resistor R_(C1) at the proximal end portion and includes strain gauge resistor R_(C2) at the distal end portion 206D. An identical pair of interleaved split half-bridges (not shown) comprising tensile gauge sensor resistors and an identical shared half-bridge (not shown) comprising compression gauge sensor resistors are formed on an adjacent orthogonal beam face 214. The pair of interleaved split half-bridges formed on adjacent orthogonal faces are configured to measure forces perpendicular to the longitudinal axis 210 of the beam 206, which may impart tensile strain to the beam. The shared compression gauge sensor resistors formed on adjacent orthogonal beam faces are configured to measure forces parallel to the longitudinal axis of the beam, which may impart compression strain to the beam 206.

FIG. 7 is an illustrative schematic diagram representative of three half-bridges. A first tension gauge half-bridge 602 includes tension strain gauge resistors R_(T1) and R_(T2) aligned along a neutral axis. A second tension gauge half-bridge 604 includes tension strain gauge resistors R_(T3) and R_(T4) aligned along a neutral axis. A compression half-bridge 606 includes compression strain gauge resistors R_(C1) and R_(C2) aligned along a neutral axis. Each of the first and second tension gauge half-bridges 602, 604 and the compression gauge half-bridge 606 is coupled to receive an input voltage V_(in). The first tension gauge half-bridge 602 is coupled to provide a first tension force output V_(O1). The second tension gauge half-bridge 604 is coupled to provide a second tension force output V_(O3). The compression gauge half-bridge 606 is coupled to produce a compression three output V_(O2). Each resistor R_(T1)-R_(T4) and R_(C1)-R_(C2) includes a plurality of parallel elongated portions aligned in parallel and coupled end-to-end to form a serpentine or snake-like configuration. The elongated portions of resistors R_(C1)-R_(C2) are aligned parallel to the longitudinal axis 210 of the beam 206 to act as compression gauge sensors. The elongated portions of resistors R_(T1)-R_(T4) are aligned perpendicular to the longitudinal axis 210 of the beam 206 to act as tension gauge sensors.

Referring again to FIG. 6, each interleaved split half-bridge has a tension gauge sensor resistor and a shared compression gauge sensor resistor disposed at the proximal end portion 206P of the beam 206. Each interleaved split half-bridge also has a tension gauge sensor and a shared compression gauge sensor disposed at the distal portion 206D of the beam 206. Specifically, strain gauge resistors, R_(T1), R_(C1) and R_(T3) are disposed at the proximal end portion 206P of the beam 206, and strain gauge resistors R_(T2), R_(C2) and R_(T4) are disposed at the distal end portion 206D of the beam 206.

FIG. 8 is an illustrative side view of the beam, indicated by dashed lines, representing arrangement of the gauge sensors of the interleaved three half-bridges example of FIG. 6. The elongated portions L_(T1) of strain gauge resistor R_(T1) are interleaved with elongated portions L_(T3) of strain gauge resistor R_(T3) so as to be co-located and occupy same longitudinal region of the beam. The interleaved strain gauge resistors R_(T1) and R_(T3) are farther from the proximal end of the beam than is the compression gauge resistor R_(C1). Lead_(T1,T2), which extends between the proximal and distal end portions, couples R_(T1) located at the proximal end portion 206P with R_(T2) located at the distal end portion 206D. Elongated portions L_(T2) of strain gauge resistor R_(T2) are interleaved with elongated portions L_(T4) of strain gauge resistor R_(T4) so as to be co-located and occupy same longitudinal region of the beam. The interleaved strain gauge resistors R_(T2) and R_(T4) are disposed closer to the distal end of the beam than is the compression gauge resistor R_(C2). Lead_(T3,T4), which extends between the proximal and distal end portions, couples R_(T3) located at the proximal end portion 206P with R_(T4) located at the distal end portion 206D. Lead_(C1,C2), which extends between the proximal and distal end portions, couples R_(C1) located at the proximal end portion 206P with R_(c2) located at the distal end portion 206D.

FIG. 9 is an illustrative perspective view of a force sensor beam 206 having a beam face 212 with a pair of staggered split half-bridges each comprising tension gauge sensor resistors formed at proximal and distal end portions of the beam and having a shared half-bridge comprising compression gauge resistors formed at proximal and distal end portions of the beam, in accordance with some examples. The schematic diagram of FIG. 7 also is representative of staggered three half-bridges of FIG. 9. A first tensile gauge half-bridge includes strain gauge resistor R_(T1) at the proximal end portion 206P and includes strain gauge resistor R_(T2) at the distal end portion 206D. A second tensile gauge half-bridge includes strain gauge resistor R_(T3) at the proximal end portion 206P and includes strain gauge resistor R_(T4) at the distal end portion 206D. The compression gauge half-bridge includes strain gauge resistor R_(C1) at the proximal end portion and includes strain gauge resistor R_(C2) at the distal end portion 206D. An identical pair of interleaved split half-bridges (not shown) comprising tensile gauge sensor resistors and an identical shared half-bridge (not shown) comprising compression gauge sensor resistors are formed on an adjacent orthogonal beam face 214. The pair of interleaved split half-bridges formed on adjacent orthogonal faces are configured to measure forces perpendicular to the longitudinal axis 210 of the beam 206, which may impart tensile strain to the beam 206. The shared compression gauge sensor resistors formed on adjacent orthogonal beam faces are configured to measure forces parallel to the longitudinal axis 210 of the beam, which may impart compression strain to the beam 206.

FIG. 10 is an illustrative side view representing arrangement of the gauge sensors of the staggered three half-bridges example of FIG. 9. A first tension gauge resistor half-bridge includes tension strain gauge resistors, R_(T1) and R_(T2) aligned along a neutral axis. A second tension gauge resistor half-bridge includes tension strain gauge resistors, R_(T3) and R_(T4) aligned along a neutral axis. A compression gauge resistor half-bridge includes compression strain gauge resistors R_(C1) and R_(C2) aligned along a neutral axis. A first compression gauge resistor R_(C1) is disposed at a proximal end portion of the beam between first and third tension gauge resistors R_(T1), R_(T3), with the first tension gauge resistor R_(T1) disposed closer to the proximal end of the beam than the third tension gauge resistor R_(T3). A second compression gauge resistor R_(C2) is disposed at a distal end portion of the beam between second and fourth tension gauge resistors R_(T2), R_(T4), with the fourth tension gauge resistor R_(T4) disposed closer to the distal end of the beam than the second tension gauge resistor R_(T2). Lead_(T1,T2), which extends between the proximal and distal end portions, couples R_(T1) located at the proximal end portion 206P with R_(T2) located at the distal end portion 206D. Lead_(T3,T4), which extends between the proximal and distal end portions, couples R_(T3) located at the proximal end portion 206P with R_(T4) located at the distal end portion 206D. Lead_(C1,C2), which extends between the proximal and distal end portions, couples R_(C1) located at the proximal end portion 206P with R_(c2) located at the distal end portion 206D.

Thus, both the interleaved split half-bridge and the staggered split half-bridge produce redundant first and second tension force output voltages V_(O1) and V_(O3). The longitudinal distribution of the tension and compression gauge sensor resistors of the pair of interleaved split half-bridges of FIG. 6 and the pair of staggered split half-bridges of FIG. 9 cancels out and substantially removes noise that may be caused by forces from other sources such as off axis load moments in any of three directions and forces in either of the two orthogonal directions to the force being measured. Moreover, in the interleaved half-bridges example of FIG. 6, the interleaving of the strain gauge resistors ensures that they measure strain at the same locations of the beam, which ensures that the redundant first output voltage V_(O1) and third output voltage V_(O3) have matching values even if there are temperature variations along the length of the beam.

In arriving at this invention, the inventor realized that each half-bridge (both tension gauge half-bridges and compression gauge half-bridge) cancels the following stresses: moment, off axis force, off axis moment, compression/tension, torsion, and ambient temperature. The inventor also realized that each individual half-bridge output includes the following: force and gradient temperature. The inventor further realized that if V_(O) is the output of the half bridge

$V_{o} = {GF*\frac{V_{in}}{4}\left( {\epsilon_{p} - \epsilon_{d}} \right)}$

Where ε_(p) and ε_(d) represent the proximate stress and the distal stress and GF represents the gauge factor.

Then subtraction in (ε_(p)−ε_(d)) in the above equation cancels: moment, off axis force, off axis moment, compression/tension, torsion, and ambient temperature, Now subtracting the ‘T gauge’ half-bridge output and ‘C gauge’ half-bridge output, we cancel the following: gradient temperature.

Vo1 is the output of the half-bridges of ‘T gauges’ and Vo2 is the output of the half-bridge of ‘C gauges’, then the subtraction in Vo1−Vo2 cancels ambient temperature and gradient temperature and the final output after subtraction is only the sought after ‘Force’

For the split half-bridge examples of FIGS. 6 and FIG. 9, redundant comparisons may be performed as follows.

The redundant comparison is done after extracting the force signal and temperature differential signal from the half-bridge measurements V_(O1),V_(O2) and V_(O3).

For X axis, for example, (indicated by ‘x’)

We can use V_(O1)_x and V_(O2)_x to get Force1_x and deltaT1_x

We can use V_(O3)_x & V_(O2)_x to get Force2_x and deltaT2_x

For Y axis (indicated by ‘y’)

We can use V_(O1)_y & V_(O2)_y to get Force1_y and deltaT1_y

We can use V_(O2)_y & V_(O2)_y to get Force2_y and deltaT2_y

For redundancy check

Force_x: we check whether Force1_x and Force2_x match

Force_y: we check whether Force1_y and Force2_y match

deltaT: we check whether deltaT1_x and deltaT1_y match

These comparison checks will cover failures in any of the gauges.

deltaT2_x and deltaT2_y are kind of throw away terms because they don't provide additional information.

The math used to compute force and deltaT from voltage output is as follows

$\mspace{20mu} {F_{} = \frac{{T\mspace{14mu} {gauge}\mspace{14mu} \text{?}} - {C\mspace{14mu} {gauge}\mspace{14mu} \text{?}}}{\left( {1 + \text{?}} \right)\text{?}}}$ $\mspace{20mu} {{{where}\mspace{14mu} \text{?}} = {\frac{1}{4}{GFV}_{in}r\frac{l_{1} - l_{2}}{El}}}$ $\mspace{20mu} {{\Delta \; T} = \frac{{C\mspace{14mu} {gauge}\mspace{14mu} \text{?}} + {\text{?}\left( {T\mspace{14mu} {gauge}\mspace{14mu} \text{?}} \right)}}{\left( {1 + \text{?}} \right)\text{?}}}$ $\mspace{20mu} {{{where}\mspace{14mu} \text{?}} = {\frac{1}{4}{GFV}_{in}{CTE}}}$ ?indicates text missing or illegible when filed

Where ‘T gauge Vo’ is V_(O1) and ‘C gauge Vo’ is V_(O2).

Thus, the distribution of gauge sensor resistors of each tension gauge half-bridge between proximal and distal end portions of the beam removes the effects of noise resulting from other sources of force and cancel the effects of temperature so that the first and second tension gauge force output signals V_(O1) and V_(O3) produce the same redundant value. The first and second tension gauge force output signal values VO1 and V_(O3) may be compared to determine whether they have different values. A determination that V_(O1) and V_(O3) have different values provides an indication of an error due to damage to the force sensor, for example.

Redundant temperature values are provided by the compression output values V_(O2) produced by the compression gauge half-bridges formed adjacent orthogonal faces. The compression output values V_(O2) produced by the half-bridges formed adjacent orthogonal faces may be compared to determine whether they have different values. A determination that the compression gauge half-bridges on adjacent orthogonal faces have different values provides an indication of an error due to damage to the force sensor, for example.

PROOF

A. Determining T-gauge strain and C-gauge strain:

FIG. 11 is an illustrative perspective view of a beam with a T-gauge (tension) and C gauge (compression) disposed along a neutral axis of a beam.

Values used to determine three and change in temperature include:

F_(g): Force along the sensing plane

l: Location of the force applied

M: Moment applied perpendicular to the sensing plane

Fz: Force applied parallel to the neutral axis

I: Moment of inertia

A: Area or cross section

CTE: Coefficient of thermal expansion

ΔT: Change in temperature

ε: Strain

p: Poisson's ratio

T-gauge strain measurement equation:

$\mspace{20mu} {\text{?} = {{- \frac{\text{?}}{\text{?}}} + \frac{\text{?}}{\text{?}} - \frac{\text{?}}{\text{?}} + {{{CTE} \cdot \Delta}\; T}}}$ ?indicates text missing or illegible when filed

C gauge strain measurement equation:

$\mspace{20mu} {\text{?} = {{{- \text{?}}\left( {{- \frac{\text{?}}{\text{?}}} + \frac{\text{?}}{\text{?}} - \frac{\text{?}}{\text{?}}} \right)} + {{{CTE} \cdot \Delta}\; T}}}$ ?indicates text missing or illegible when filed

B. Determining Force and ΔT:

FIG. 12 is an illustrative perspective view of a beam with tension gauges R1 and R2 disposed along a neutral axis of a beam, respectively, at a proximal end portion and at a distal end portion of the beam. FIG. 13 is an illustrative schematic diagram representing a half-bridge circuit containing R1 and R2 of FIG. 12.

For the half-bridge of FIGS. 12-13, using the above T-gauge strain measurement, we can calculate V₀ based upon R1, R2 and V_(in)

$V_{o} = {\frac{R\; 2}{{R\; 1} + {R\; 2}}*V_{in}}$ R_(i) = R + Δ R_(i)  where  i = 1, 2 Δ R_(i) = GF*∈_(i)

The nominal resistance of both gauges is the same R value under no load. The change in resistance dependence on strain experienced by the gauge times the gauge factor. For small resistance change, using first order approximation we get the following equation.

V ₀=½+¼(ϵ₂−ϵ₁)*GF*V _(in)

We can substitute the strain equation to get V₀ in terms of force.

${T\mspace{14mu} {gauge}\mspace{14mu} V_{o}} = {\frac{1}{2} + {\frac{1}{4}\left( {{F_{}r\frac{\left( {l_{1} - l_{2}} \right)}{El}} + {{CTE}\left( {{\Delta \; T_{2}} - {\Delta \; T_{1}}} \right)}} \right)*{GF}*V_{in}}}$

Similarly, we get an equation for the half-bridge using the compression (C) gauges.

${C\mspace{14mu} {gauge}\mspace{14mu} V_{o}} = {\frac{1}{2} + {\frac{1}{4}\left( {{{- \rho_{r}}F_{}r\frac{\left( {l_{1} - l_{2}} \right)}{El}} + {{CTE}\left( {{\Delta \; T_{2}} - {\Delta \; T_{1}}} \right)}} \right)*{GF}*V_{in}}}$

With equations for C gauge and T gauge, we can solve for F₁₁ and ΔT=(ΔT₁−ΔT₂), we get,

$F_{} = \frac{{T\mspace{14mu} {gauge}\mspace{14mu} V_{o}} - {C\mspace{14mu} {gauge}\mspace{14mu} V_{o}}}{\left( {1 + \rho_{r}} \right)K_{f}}$ ${{where}\mspace{14mu} K_{f}} = {\frac{1}{4}{GFV}_{in}r\frac{l_{1} - l_{2}}{El}}$ ${\Delta \; T} = \frac{{C\mspace{14mu} {gauge}\mspace{14mu} V_{o}} - {\rho_{r}\left( {T\mspace{14mu} {gauge}\mspace{14mu} V_{o}} \right)}}{\left( {1 + \rho_{r}} \right)K_{f}}$ ${{where}\mspace{14mu} K_{r}} = {\frac{1}{4}{GFV}_{in}{CTE}}$

C. Basic force measurement using strain:

FIG. 14 is an illustrative side view of a force applied to a cantilever beam indicating strain measurement at a distance l from the location where force is applied to the beam.

Strain Equation for a perpendicular force applied on distal end a

Cantilever Beam is

$\epsilon = \frac{FLr}{EI}$

Where

E: Modulus of elasticity

I: Moment of inertia

We can see that the strain equation depends on the force ‘F’ applied as well as the distance ‘l’ from the sensing point. Therefore, to be able to measure the Force applied we need a second measurement to eliminate the dependence of ‘l’. The most obvious way to do this is to measure the strain at different point along the beam.

FIG. 15 is an illustrative side view of a force applied to a cantilever beam indicating strain measurement at a proximal distance lprox and at a distal distance ldist from the location where force is applied to the beam. Then we get

$\epsilon_{prox} = \frac{{Fl}_{prox}r}{EI}$ $\epsilon_{dist} = \frac{{Fl}_{dist}r}{EI}$

Then when we subtract the 2 measurements we get

${\epsilon_{prox} - \epsilon_{dist}} = {\frac{Fr}{EI}\left( {l_{prox} - l_{dist}} \right)}$

The difference in distance is a known quantity; it is the distance between the two sensing points.

D. Force measurements under noise sources

FIG. 1.6 is a side view of a cantilever beam.

In typical force measurement scenario there is presence of noise sources/signals that are of no interest to us but still produce a measurable strain on the beam, which we are sensing and this will result in incorrect estimation of the force applied. Some other sources of strain that could be present are

-   -   Force in the 2 orthogonal directions     -   Moments in all 3 directions     -   Temperature changes

If the reference frame is selected such that the Force we want to measure is oriented along X axis then, the unwanted strain sources for measuring are, Forces (Fy, Fz), Moments (Mx, My, Mz) and Temperature (ΔT)

Therefore, the most general strain equation for a point sensing element on the cantilever beam oriented parallel to neutral axis is as follows

$\begin{matrix} {{T\mspace{14mu} {gauge}\mspace{14mu} {strain}} = \epsilon_{t}} \\ {= {{- \frac{F_{x}{lr}}{EI}} - \frac{F_{y}{dr}}{EI} + \frac{F_{Z}}{EA} - \frac{M_{y}r}{EI} + \frac{M_{x}d}{EI} +}} \\ {{\epsilon_{t_{M_{z}}} + {{CTE}*\Delta \; T}}} \end{matrix}$ $\begin{matrix} {{C\mspace{14mu} {gauge}\mspace{14mu} {strain}} = \epsilon_{c}} \\ {= {{- {\rho_{r}\left( {{- \frac{F_{x}{lr}}{EI}} - \frac{F_{y}{dr}}{EI} + \frac{F_{Z}}{EA} - \frac{M_{y}r}{EI} + \frac{M_{x}d}{EI}} \right)}} +}} \\ {{\epsilon_{c_{M_{z}}} + {{CTE}*\Delta \; T}}} \end{matrix}$

Where

E: Modulus of elasticity I: Moment of inertia r: Perpendicular distance to YZ plane passing through the neutral axis d: Perpendicular distance to XZ plane passing through the neutral axis A: Area of cross section CTE: Coefficient of thermal expansion

ɛ_(c_(M_(z)))

: Strain due to torsion M_(Z) perpendicular to neutral axis

ϵ_(t_(M_(z)))

: Strain due to torsion M_(Z) parallel to neutral axis

p_(r): poisson ratio of the substrate

As can be see from the equation above, a point measurement of strain will be dependent on lot of strain sources. The act of subtracting the proximal and distal measurements will also eliminate some sources of strain as common mode. The following gets eliminated

-   -   Force: Fz     -   Moments: My, Mz

If the sensing point/element is placed symmetrically about the neutral axis (d=0), then the following does not affect the strain measurement

-   -   Force: Fy     -   Moment: Mx

Therefore the strain source that is not compensated is temperature change. The most trivial way to compensate for temperature is to use Wheatstone bridge configuration using ‘C’ (compression) and ‘T’ (tension) gauges to locally eliminate strain from temperature change.

FIG. 17A is a side view of a beam with a Wheatstone bridge disposed at a proximal end thereof. FIG. 17B is a schematic diagram of the Wheatstone bridge circuit of FIG. 17A.

The output of the Wheatstone bridge is as follows

$V_{out} = {\left( {\frac{R_{1}}{R_{1} + R_{2}} - \frac{R_{4}}{R_{3} + R_{4}}} \right)V_{in}}$

The resistance strain relationship of gauges is as follows

R=R _(o) +GF*ϵ*R _(o)

If the nominal resistance of all the gauges are same and if substitute the strain—resistance relationship and perform a first order approximation we get the following equation

$V_{out} = {{GF}*\frac{V_{in}}{4}\left( {\epsilon_{2} - \epsilon_{1} - \left( {\epsilon_{3} - \epsilon_{4}} \right)} \right)}$

When Fx is applied, the above equation reduces to the form

V _(out) =K*F*l

Where K is a scalar constant and l=Δl+(1+p_(r))l₁ and Δl=l₂−l₁

So, we get output signal proportional to applied force

When there is a temperature change then the strain seen by all gauges are same and the output ends up being zero, which implies temperature changes are compensated locally.

Therefore, to measure the applied force in the sensing direction (x axis) we need two Wheatstone bridge located near the proximal and distal end of the beam.

E. Measuring force using a single Wheatstone bridge

FIG. 18 is a side view of a beam with a split Wheatstone bridge having a tension gauge resistor R1 and a compression gauge resistor R2 disposed along a neutral axis at a proximal end portion thereof and having a tension gauge resistor R3 and a compression gauge resistor R4 disposed along a neutral axis at a distal end portion thereof. The schematic diagram of FIG. 17B is applicable to the split bridge of FIG. 18.

If we look at the trivial design we locally compensate for temperature, then measure two signals and externally subtract the two signals to get Force applied, but the structure of Wheatstone bridge equation has the ability subtract signals internally, so we can use this to our advantage. Also, we can arrange the gauges such that instead of temperature being compensated locally we can compensate temperature effect globally.

The temperature change seen at each measuring point can be decomposed into ambient temperature change which is same everywhere and temperature difference which is temperature delta between the ambient temperature and the temperature at the point. The ambient temperature change ends up being a common mode and just the act of subtracting the proximal and distal signal eliminates its effects.

In the above configuration, we get the output signal as

$V_{out} = {{GF}*\frac{V_{in}}{4}\left( {\left( {\epsilon_{1} - \epsilon_{2}} \right) - \left( {\epsilon_{3} - \epsilon_{4}} \right)} \right)}$

If there was not temperature difference then we can see that R1 and R2 together can measure force applied and similarly R3 and R4 can measure the force applied, since R1, R2 is Tension gauge and R3,R4 is compression gauge their relationship with force applied varies by −p_(r). Therefore, the total equation will reduce to

$V_{out} = {{GF}*\frac{V_{in}}{4}\left( {{K*F_{x}} - \left( {{- \rho_{r}}K*F_{x}} \right)} \right)}$

-   -   Where K is a fixed constant

$V_{out} = {{GF}*\frac{V_{in}}{4}K*\left( {1 + \rho_{r}} \right)F_{x}}$

The same configuration for temperature difference has different result, R1 and R2 measure the effect of temperature difference between the proximal and distal gauges, similarly R3 and R4 measure the effect of temperature difference. Even though the two pairs are different gauge types, they have the same sensitivity to strain due to temperature changes

$V_{out} = {{GF}*\frac{V_{in}}{4}\left( {{K*\Delta \; T} - \left( {K*\Delta \; T} \right)} \right)}$

-   -   Where K is a fixed constant     -   V_(out)=0

So, we can roughly consider the ‘C’ gauges as temperature compensation gauges and ‘T’ gauges as the measurement gauges.

FIG. 19 is an illustrative drawing representing a force sensor 1900 that includes a beam 1902 with two split full bridge circuits thereon. The beam 1902 includes a proximal end portion 1902P and a distal end portion 1902D and a center portion therebetween. A first split bridge circuit includes strain gauge resistors R_(C1), R_(C3), R_(T1), R_(T3). The first bridge circuit is split, with compression strain gauge resistor R_(C1) and tension gauge resistor R_(T1) located at a proximal end portion of the beam and compression strain gauge resistor R_(C3) and tension gauge resistor R_(T3) located at a distal end portion of the beam, R_(T3). A second split bridge circuit includes strain gauge resistors R_(C2), R_(C4), R_(T2), R_(T4). The second bridge circuit is split, with compression strain gauge resistor R_(C2) and tension gauge resistor R_(T2) located at a proximal end portion of the beam and compression strain gauge resistor R_(C4) and tension gauge resistor R_(T4) located at a distal end portion of the beam.

Electrically conductive measurement output lead lines L1-L4 and input signal lead lines L5-L6 disposed upon the beam, electrically couple the strain gauge resistors as shown. Measurement output lead line L1 is disposed to extend integral with the proximal, center and distal portions of the beam to electrically couple R_(T1) and R_(T3) at a node V_(O1) ⁻. Measurement output lead line L2 is disposed to extend integral with the proximal, center and distal portions of the beam to electrically couple R_(C1) and R_(C3) at a node V_(O1) ⁺. Measurement output lead line L3 is disposed to extend integral with the beam to electrically couple R_(C2) and R_(C4) at a node V_(O2) ⁺. Measurement output lead line L4 is disposed to extend integral with the beam to electrically couple R_(T2) and R_(T4) at a node V_(O2) ⁻. Input signal lead line L5 extends within the proximal portion of the beam to electrically couple R_(C1), R_(C2), R_(T1) and R_(T2) at a node V_(I) ⁺. Input signal lead line L6 extends within the distal portion of the beam to electrically couple R_(C3), R_(C4), R_(T3) and R_(T4) at a node V_(I) ⁻. The lead lines L1-L6 are disposed integral with and mechanically coupled to the beam.

Input tap nodes V_(I) ⁺, coupled to R_(T1), R_(T3), R_(C1), R_(C3), and V_(I) ⁻, coupled to R_(T2), R_(T4), R_(C2), R_(C4) act as input signal nodes that are coupled to receive positive and negative polarities of an input excitation signal. Measurement tap nodes V_(O1) ⁻ and V_(O1) ⁺ at the respective junction of R_(T1), R_(T3) and the junction of R_(C1), R_(C3), act as output measurement signal nodes that are coupled to provide output measurement signals indicative of strain. Likewise, measurement tap nodes V_(O2) ⁻ and V_(O2) ⁺ at the respective junction of R_(T2), R_(T4) and the junction of R_(C2), R_(C4), act as output measurement signal nodes that are coupled to provide output measurement signals indicative of strain.

Since each split bridge includes both strain gauge resistors disposed at a proximal end portion of the beam and strain gauge resistors disposed at a distal end portion of the beam, the lead lines L1-L6 that electrically couple the resistors of each bridge are relatively long. For example, lead lines that couple the resistors of the first and second split bridges of FIG. 19 are relatively longer than lead lines used to couple resistors of the non-split bridge circuits of the illustrative bridge of FIG. 1 in which each bridge is located either entirely at a proximal end portion of the beam or at a distal end portion of the beam.

A split bridge circuit can introduce undesirable amounts of unbalanced lead resistance between the strain gauges because the gauges are distributed at beam location across large distances relative to the size of the strain gauges. The lead resistance can affect the accuracy of the sensor measurements and introduce cross coupling and temperature dependent offset.

More particularly the conductive lead lines are integrally formed upon the beam through deposition and etching process that produce the strain gauges. Preferably, the lead lines do not change electrical properties in response to forces imparted to a beam or to a change in temperature, for example. However, the conductive lead lines extending along the beam to couple the active resistive strain gauges at opposite end portions of the beam are subjected to strain as the beam deflects in response to force imparted to the beam, which changes the resistance of the conductive lines. In some examples, the length of the lead lines may be comparable in magnitude to the overall length of the conductor line portions that make up the of the serpentine-shaped resistive strain gauge elements. A change in resistance of the electrical conduction lines can result in distortion of strain measurements since the electrical connection lines are not intended as behave as active resistive elements of the bridge circuits. Thus, there is a need to reduce lead resistances and balances what minimal lead resistance remains left over.

FIG. 20A-20B are is illustrative drawing representing an example force sensor 2000 that includes a beam 2002 having a neutral axis 2004 and that includes two split full bridge circuits with split bridge halves electrically coupled by measurement output lead lines L1′-L4′ and electrically coupled input lead lines L5-L6 are mechanically isolated from the the beam 2002. FIG. 20A illustrates the strain gauge elements R_(C1)-R_(C4) and R_(T1)-R_(T4) of split bridge halves in simplified block diagram form, and shows mechanically isolated measurement output lead lines L1′-L4′ extending between the strain gauge elements of the split bridge halves and shows input signal lead line L5′ electrically coupling R_(C1), R_(C2), R_(T1) and R_(T2) at a node V_(I) ⁺ and shows input signal lead line L6′ electrically coupling R_(C3), R_(C4), R_(T3) and R_(T4) at a node V_(I) ⁻. FIG. 20B illustrates details of a first example arrangement of the strain gauge elements R_(C1)-R_(C4) and R_(T1)-R_(T4) of the example sensor of FIG. 20A. FIG. 20C illustrates details of a second example arrangement of the strain gauge elements R_(C1)-R_(C4) and R_(T1)-R_(T4) of the example sensor 2000 of FIG. 20A. To simplify the drawings, the mechanically isolated measurement output lead lines L1′-L4′ and input lead lines L5-L6 are omitted from FIGS. 20B-20C, although their interconnections are explained below.

Referring to FIG. 20A, mechanically isolated measurement output lead lines L1′-L4′ of FIG. 20A correspond to correspondingly labeled integral measurement output lead lines L1-L4 of FIG. 19. The mechanically isolated lead lines L1′-L4′ are routed externally off the beam, one example of this implementation is to have the leads L1′-L6′ be part of a flex circuit/cable that is wirebonded to the beam. The flex cable will be mounted such that it has enough slack that the deflection of the beam due to force applied doesn't produce any strain the flex circuit/cable, moreover the lead lines on the flex circuit can be made of lower resistance electrical material, such as Copper in comparison to the higher resistance thin film material, such as Nichrome (an alloy of Nickel and Chromium), thus providing a lowerer magnitude the lead resistances. Thus, the lead lines L1′-L4′ that electrically couple the strain gauge elements are mechanically isolated from strain imparted during deflection of the beam 2002 due to a deflecting force (not shown) applied to the beam.

Referring to the example two-bridge arrangement FIG. 20B, except for the change in lead lines, the arrangement of the example force sensor 2000 of FIG. 20B is identical to that of the sensor of FIG. 19. Elongated measurement output lead lines L1′-L4′ and input lead lines L5-L6 are mechanically isolated from the beam and shorter integral proximal lead line segments X_(P1)-X_(P6) and shorter integral distal lead line segments X_(D1)-X_(D6) are disposed integral with the beam. As a result, less stress is imparted to the leads during mechanical deflection of the beam, and therefore, less strain measurement distortion is incurred when compared with the example sensor of FIG. 19.

Mechanically isolated lead line L1′ is disposed to extend in mechanical isolation from the beam between the proximal, center and distal portions of the beam, to electrically couple R_(C1) and R_(C3) at nodes labeled V_(O1) ⁻ in the proximal and distal bridge halves. Isolated lead line L2′ is disposed to extend in mechanical isolation from the beam between the proximal, center and distal portions of the beam, to electrically couple R_(T1) and R_(T3) at nodes labeled V_(O1) ⁺ in the proximal and distal bridge halves. Isolated lead line L3′ is disposed to extend in mechanical isolation from the beam between the proximal, center and distal portions of the beam, to electrically couple R_(C2) and R_(C4) at nodes labeled V_(O2) ⁻ in the proximal and distal bridge halves. Isolated lead line L4′ is disposed to extend in mechanical isolation from the beam between the proximal, center and distal portions of the beam, to electrically couple R_(T2) and R_(T4) at nodes labeled V_(O2) ⁺ in the proximal and distal bridge halves. Proximal lead line elements X_(P3)-X_(P4) are coupled to voltage V_(I) ⁺ to thereby electrically couple R_(C1), R_(C2), R_(T1) and R_(T2) at the voltage V_(I) ⁺. Distal lead line elements X_(D3)-X_(D4) are coupled to voltage V_(I) ⁻ to thereby electrically couple R_(C3), R_(C4), R_(T3) and R_(T4) to the voltage V_(I) ⁺.

Referring to the example two-bridge arrangement FIG. 20C, each of the compression gauge resistors and each of the tension gauge resistors is arranged symmetrically about the neutral axis 2004 of the beam. Moreover, in the second example arrangement, R_(C1) and R_(T1) of the proximal half of the first bridge and R_(C2) and R_(T2) of the proximal half of the second bridge are arranged symmetrically about a proximal transverse axis 2006P between them at the proximal portion of the beam. R_(T1) partiality surrounds R_(C1), and R_(T2) partially surrounds RC₂. Terminals of R_(C1) and R_(T1) are transversely aligned proximate to the proximal transverse axis 2006P, and terminals of R_(C2) and R_(T2) are transversely aligned distal to the proximal transverse axis 2006P. Likewise, R_(C3) and R_(T3) of the distal half of the first bridge and R_(C4) and R_(T4) of the distal half of the second bridge are further arranged symmetrically about a distal transverse axis 2006D between them at the distal portion of the beam. Terminals of R_(C3) and R_(T3) are transversely aligned proximate to the distal transverse axis 2006D, and terminals of R_(C4) and R_(T4) are transversely aligned distal to the distal transverse axis 2006D. R_(C3) partially surrounds R_(C3), and R_(T4) partially surrounds R_(C4).

Still referring to FIG. 20C, elongated lead line segments L1′-L4′ are mechanically isolated from the beam and shorter integral proximal lead line segments X_(P7)-X_(P8) and shorter integral distal lead line segments X_(D7)-X_(D8) are disposed integral with the beam. As a result, less stress is imparted to the leads during mechanical deflection of the beam, and therefore, less strain measurement distortion is incurred when compared with the example sensor of FIG. 19.

The coupling between nodes and lead lines is the same for the first and second example arrangements of FIGS. 20B-20C. More specifically, referring to FIG. 20C, mechanically isolated lead line L1′ is disposed to extend in mechanical isolation from the beam between the proximal, center and distal portions of the beam, to electrically couple R_(C1) and R_(C3) at nodes labeled V_(O1) ⁻ in the proximal and distal bridge halves. Isolated lead line L2′ is disposed to extend in mechanical isolation from the beam between the proximal, center and distal portions of the beam, to electrically couple R_(T1) and R_(T3) at nodes labeled V_(O1) ⁺ in the proximal and distal bridge halves. Isolated lead line L3′ is disposed to extend in mechanical isolation from the beam between the proximal, center and distal portions of the beam, to electrically couple R_(C2) and R_(C4) at nodes labeled V_(O2) ⁻ in the proximal and distal bridge halves. Isolated lead line L4′ is disposed to extend in mechanical isolation from the beam between the proximal, center and distal portions of the beam, to electrically couple R_(T2) and R_(T4) at nodes labeled V_(O2) ⁺ in the proximal and distal bridge halves. Proximal lead line elements X_(P7)-X_(P8) are coupled to voltage V_(I) ⁺ to thereby electrically couple R_(C1), R_(C2), R_(T1) and R_(T2) at the voltage V_(I) ⁺. Distal lead line elements X^(D7)-X_(D8) are coupled to voltage V_(I) ⁻ to thereby electrically couple R_(C3), R_(C4), R_(T3) and R_(T4) to the voltage V_(I) ⁺.

FIG. 21 is an illustrative drawing showing a set of proximal connection pads 2110P and a set of distal connection pads 2110D disposed upon the beam 2002 of FIG. 20A in which input pads 2112 and measurement pads 2114 have matching areas. The set of proximal connection pals 2110 and the set of distal connection pads 2110 are disposed upon an example beam 2002 for electrical coupling of mechanically isolated measurement output lead lines L1′-L4′ and input signal lines L5′-L6′ to the strain gauge resistors. Wire bonds (they are there in FIG. 21 it is the small arc going from the pads to the collection of lead lines. Also please include L5-L6 to bundle of leads) electrically couple the measurement output leads L1′-L4′ to the pads measurement pads 2114 and to couple the input signal leads L5′-L6′ to the input pads 2112. Input signal pads 2112 are coupled to receive the excitation voltage V_(I) ⁺, V_(I) ⁻, as shown. Measurement output pads 2114 are coupled to receive the sensed output voltages V_(O1) ⁻, V_(O1) ⁺, V_(O2) ⁻, V_(O2) ⁺, as shown.

Conventionally, all pads typically are the same area, and therefore, have the same resistance. The wire bonds can be variable, however, which can impact the resistance of the electrical connection between the pads and the leads, which in turn, can influence zero offset between signals on the different electrical leads and also may influence temperature sensitivity of the electrical connection. Increased resistance at the input pads affects gain of the voltage, which is related to sensitivity of measurement. Increased resistance at the output measurement pads affects the zero offset. In general, gain can be more easily managed than zero offset, using software, for example.

FIG. 22 is an illustrative drawing showing a set of proximal connection pads 2110P′ and a set of distal connection pads 2110D′ in which measurement output pads 2114′ have larger area than input signal pads 2112′. Input pad area is sacrificed to provide larger measurement pad area. The larger measurement pad area results in reduced resistance of the measurement pads 2114′, which reduces the impact of wire bond variation upon connection pad resistance, which in turn, reduces the impact of wire bond variation upon zero offset. Thus, a relative increase in measurement pad size compared with input signal pad size reduces variability of measurement pad resistance reducing the impact of variation in location and size of a wire bond upon measurement accuracy.

Still referring to FIG. 22, the set of proximal connection pads 2110P′ and the set of distal connection pads 211013′ are disposed upon an example beam 2002 for electrical coupling of mechanically isolated lead lines L1′-L4′ and L5′-L6′ to strain gauge resistors. Wire bonds electrically couple the leads L1′-L4′ to the measurement output pads 2114′. Input signal pads 2112′ are coupled to receive the excitation voltage V_(I) ⁺, V_(I) ⁻, as shown. Measurement signal output pads 2114′ are coupled to receive the sensed output voltages V_(O1) ⁻, V_(O1) ⁺, V_(O2) ⁻, V_(O2) ⁺, as shown.

FIG. 23 is an illustrative circuit schematic showing a force sensor 2000 that includes example first and second split bridge circuits 2310, 2320 disposed upon a beam that share excitation voltage inputs V_(I) ⁺, V_(I) ⁻. Half of each bridge circuit is disposed at a proximal end portion of the beam, and half of each bridge circuit is disposed at a distal portion of the beam. To simplify the drawing, however, FIG. 23 does not show the physical separation of the proximal and distal halves at opposite end portions of the beam. FIG. 23 shows the example arrangement of the first and second split bridge circuits at non-overlapping separate locations upon the beam. FIG. 5 shows an example staggered arrangement of the first and second split bridge circuits. FIG. 6 shows an example interleaved arrangement of the first and second split bridge circuits.

As explained above, measurement redundancy is achieved using two split bridge circuits, each having a half-bridge disposed at the proximal end portion of the beam and having a half-bridge portion disposed at the distal end portion of the beam. For example, a mismatch of corresponding output measurements of the two split bridge circuits is indicative of measurement error and possible damage of one or both of the two bridge circuits. To ensure accuracy in determination of measurement mismatches, for example, the resistance of corresponding tap lead lines for first and second bridge circuits should match.

FIG. 24 is an illustrative drawing representing the tap lead lines for the example dual split bridge circuit of FIG. 23. Tap lead lines between a voltage level and a circuit node have equal lead line lengths and have uniform line widths to provide matching resistance between a given tap point and each of the circuit nodes electrically coupled to the tap point. Thus, resistances between each tap point and the nodes electrically coupled to the tap point is balanced.

In particular, for example, the tap lead line length and lead line width between tap point of excitation input voltage V_(I) ⁺ and the circuit node receiving V_(I) ^(+A) equals the tap lead line length and lead line width between tap point of voltage V_(I) ⁺ and circuit node receiving V_(I) ^(+B) as indicated by the single hash marks on either side of the V_(I) ⁺ tap point.

The tap lead line length and lead line width between tap point of excitation input voltage V_(I) ⁻ and the circuit node receiving V_(I) ^(−A) equals the tap lead line length and lead line width between tap point of voltage V_(I) ⁻ and circuit node receiving V_(I) ^(−B) as indicated by the double hash marks on either side of the V_(I) ⁻ tap point.

The tap lead line length and lead line width between tap point of measurement voltage V_(O1) ⁺ and the circuit node providing V_(O1) ^(+A) equals the tap lead line length and lead line width between tap point of voltage V_(O1) ⁺ and circuit node receiving V_(O1) ^(+B) as indicated by the three hash marks on either side of the V_(O1) ⁺ tap point.

The tap lead line length and lead line width between tap point of measurement voltage V_(O1) ⁻ and the circuit node providing V_(O1) ^(−A) equals the tap lead line length and lead line width between tap point of voltage V_(O1) ⁻ and circuit node receiving V_(O1) ^(−B) as indicated by the four hash marks on either side of the V_(O1) ⁻ tap point.

The tap lead line length and lead line width between tap point of measurement voltage V_(O2) ⁺ and the circuit node providing V_(O2) ^(+A) equals the tap lead line length and lead line width between tap point of voltage V_(O2) ⁺ and circuit node receiving V_(O2) ^(+B) as indicated by the five hash marks on either side of the V_(O2) ⁺ tap point.

The tap lead line length and lead line width between tap point of measurement voltage V_(O2) ⁻ and the circuit node providing V_(O2) ^(−A) equals the tap lead line length and lead line width between tap point of voltage V_(O2) ⁻ and circuit node receiving V_(O2) ^(−B) as indicated by the five hash marks on either side of the V_(O2) ⁻ tap point.

The equal tap lead line length ensures balanced tap line lead length resistance on each side of each tap point resulting in more accurate determinations of circuit damage based upon measurement output signal mismatches, for example.

Although illustrative examples have been shown and described, a wide range of modification, change and substitution is contemplated in the foregoing disclosure and in some instances, some features of the examples may be employed without a corresponding use of other features. One of ordinary skill in the art would recognize many variations, alternatives, and modifications. Thus, the scope of the disclosure should be limited only by the following claims, and it is appropriate that the claims be construed broadly and in a manner consistent with the scope of the examples disclosed herein. The above description is presented to enable any person skilled in the art to create and use a force sensor with a beam and a distributed bridge circuit. Various modifications to the examples will be readily apparent to those skilled in the art, and the generic principles defined herein may be applied to other examples and applications without departing from the scope of the invention. In the preceding description, numerous details are set forth for the purpose of explanation. However, one of ordinary skill in the art will realize that the invention might be practiced without the use of these specific details. In other instances, well-known processes are shown in block diagram form in order not to obscure the description of the invention with unnecessary detail. Identical reference numerals may be used to represent different views of the same or similar item in different drawings. Thus, the foregoing description and drawings of examples in accordance with the present invention are merely illustrative of the principles of the invention. Therefore, it will be understood that various modifications can be made to the examples by those skilled in the art without departing from the scope of the invention, which is defined in the appended claims. 

1-33. (canceled)
 34. A force sensor comprising: a beam comprising a proximal end portion, a distal end portion, a first face between the proximal end portion of the beam and the distal end portion of the beam, and a longitudinal axis extending between the proximal end portion of the beam and the distal end portion of the beam; a first Wheatstone bridge on the first face of the beam, the first Wheatstone bridge comprising first and second tension gauge resistors and first and second compression gauge resistors; and a second Wheatstone bridge on the first face of the beam, the second Wheatstone bridge comprising third and fourth tension gauge resistors and third and fourth compression gauge resistors; wherein the first and third tension gauge resistors and the first and third compression gauge resistors are at the proximal end portion of the beam; and wherein the second and fourth tension gauge resistors and the second and fourth compression gauge resistors are at the distal end portion of the beam.
 35. The force sensor of claim 34, wherein: the first and third tension gauge resistors are co-located on the beam; the first and third compression gauge resistors are co-located on the beam; the second and fourth tension gauge resistors are co-located on the beam; and the second and fourth compression gauge resistors are co-located on the beam.
 36. The force sensor of claim 34, wherein: the first and third tension gauge resistors comprise corresponding first and third tension gauge resistor elongated portions, and the first and third tension gauge elongated portions are interleaved with one another; the first and third compression gauge resistors comprise corresponding first and third compression gauge resistor elongated portions, and the first and third compression gauge elongated portions are interleaved with one another; the second and fourth tension gauge resistors comprise corresponding second and fourth tension gauge resistor elongated portions, and the second and fourth tension gauge elongated portions are interleaved with one another; and the second and fourth compression gauge resistors comprise corresponding second and fourth compression gauge resistor elongated portions, and the second and fourth compression gauge elongated portions are interleaved with one another.
 37. The force sensor of claim 34, wherein: the first and third tension gauge resistors comprise corresponding first and third tension gauge resistor serpentine configurations, and the first and third tension gauge serpentine configurations are interleaved with each other; the first and third compression gauge resistors comprise corresponding first and third compression gauge resistor serpentine configurations, and the first and third compression gauge serpentine configurations are interleaved with each other; the second and fourth tension gauge resistors comprise corresponding second and fourth tension gauge resistor serpentine configurations, and the second and fourth tension gauge serpentine configurations are interleaved with each other; and the second and fourth compression gauge resistors comprise corresponding second and fourth compression gauge resistor serpentine configurations, and the second and fourth compression gauge serpentine configurations are interleaved with each other.
 38. The force sensor of claim 34, wherein: the beam comprises a neutral axis that extends in the first face of the beam parallel to the longitudinal axis and is equidistant from opposite edges of the first face; the first, second, third, and fourth tension gauge resistors are located on the first face and are aligned along the neutral axis in the first face of the beam; and the first, second, third, and fourth compression gauge resistors are located on the first face and are aligned along the neutral axis in the first face of the beam.
 39. The force sensor of claim 34, wherein: one of the first and third tension gauge resistors is between the first and third compression resistors, and the other of the first and third tension gauge resistors is adjacent to only one or the other of the first and third compression resistors; and one of the second and fourth tension gauge resistors is between the second and fourth compression resistors, and the other of the second and fourth tension gauge resistors is adjacent to only one or the other of the second and fourth compression resistors.
 40. The force sensor of claim 39, wherein: the beam comprises a neutral axis that extends in the first face of the beam parallel to the longitudinal axis and is equidistant from opposite edges of the first face; the first, second, third, and fourth tension gauge resistors are located on the first face and are aligned along the neutral axis in the first face of the beam; and the first, second, third, and fourth compression gauge resistors are located on the first face and are aligned along the neutral axis in the first face of the beam.
 41. The force sensor of claim 34, wherein: the beam comprises a second face orthogonal to the first face; the force sensor comprises a third Wheatstone bridge on the second face of the beam, and the third Wheatstone bridge comprises fifth and sixth tension gauge resistors and fifth and sixth compression gauge resistors; the force sensor comprises a fourth Wheatstone bridge on the second face of the beam, and the fourth Wheatstone bridge comprises seventh and eighth tension gauge resistors and seventh and eighth compression gauge resistors; the fifth and seventh tension gauge resistors and the fifth and seventh compression gauge resistors are at the proximal end portion of the beam; and the sixth and eighth tension gauge resistors and the sixth and eighth compression gauge resistors are at the distal end portion of the beam.
 42. A force sensor comprising: a beam comprising a proximal end portion, a distal end portion, a first face between the proximal end portion of the beam and the distal end portion of the beam, and a longitudinal axis extending between the proximal end portion of the beam and the distal end portion of the beam; a first tension gauge half Wheatstone bridge on the first face of the beam, the first tension gauge half Wheatstone bridge comprising first and second tension gauge resistors; a second tension gauge half Wheatstone bridge on the first face of the beam, the second tension gauge half Wheatstone bridge comprising third and fourth tension gauge resistors; and a compression gauge half Wheatstone bridge on the first face of the beam, the compression gauge half Wheatstone bridge comprising first and second compression gauge resistors; wherein the first and third tension gauge resistors and the first compression gauge resistor are at the proximal end portion of the beam; and wherein the second and fourth tension gauge resistors and the second compression gauge resistor are at the distal end portion of the beam.
 43. The force sensor of claim 42, wherein: the first and third tension gauge resistors are co-located on the beam; and. the second and fourth tension gauge resistors are co-located on the beam.
 44. The force sensor of claim 42, wherein: the first and third tension gauge resistors comprise corresponding first and third tension gauge resistor elongated portions, and the first and third tension gauge elongated portions are interleaved with one another; and the second and fourth tension gauge resistors comprise corresponding second and fourth tension gauge resistor elongated portions, and the second and fourth tension gauge resistor elongated portions are interleaved with one another.
 45. The force sensor of claim 42, wherein: the first and third tension gauge resistors comprise corresponding first and third tension gauge resistor serpentine portions, and the corresponding first and third tension gauge resistor portions are interleaved with each other; and the second and fourth tension gauge resistors comprise corresponding second and fourth tension gauge resistor serpentine portions, and the corresponding second and fourth tension gauge resistor portions are interleaved with each other.
 46. The force sensor of claim 42, wherein: the beam comprises a neutral axis that extends in the first face of the beam parallel to the longitudinal axis and equidistant from opposite edges of the first face; the first, second, third, and fourth tension gauge resistors are located on the first face and are aligned along the neutral axis in the first face of the beam; and the first and second compression gauge resistors are located on the first face and are aligned along the neutral axis in the first face of the beam.
 47. The force sensor of claim 42, wherein: the first compression gauge resistor is between the first and third tension gauge resistors; and the second compression gauge resistor is between the second and fourth tension gauge resistors.
 48. The force sensor of claim 47, wherein: the beam comprises a neutral axis that extends in the first face of the beam parallel to the longitudinal axis and equidistant from opposite edges of the first face; the first, second, third and fourth tension gauge resistors are located on the first face and are aligned along the neutral axis in the first face of the beam; and the first and second compression gauge resistors are located on the first face and are aligned along the neutral axis in the first face of the beam.
 49. The force sensor of claim 42, wherein: the beam comprises a second face orthogonal to the first face; the force sensor comprises a third tension gauge half Wheatstone bridge on the second face of the beam, and the third tension gauge half Wheatstone bridge comprises fifth and sixth tension gauge resistors; the force sensor comprises a fourth tension gauge half Wheatstone bridge on the second face of the beam, and the fourth tension gauge half Wheatstone bridge comprises seventh and eighth tension gauge resistors; the force sensor comprises a second compression gauge half Wheatstone bridge on the second face of the beam, and the second compression gauge half Wheatstone bridge comprises third and fourth compression gauge resistors; the fifth and seventh tension gauge resistors and the third compression gauge resistor are at a proximal end portion of the beam; and the sixth and eighth tension gauge resistors and the fourth compression gauge resistor are at a distal end portion of the beam.
 50. A force sensor comprising: a proximal end portion, a distal end portion, a first face between the proximal end portion of the beam and the distal end portion of the beam, and a longitudinal axis extending between the proximal end portion of the beam and the distal end portion of the beam; a first bridge circuit on the first face of the beam, the first bridge circuit comprising multiple tension gauge resistors; a second bridge circuit on the first face of the beam, the second bridge circuit comprising multiple tension gauge resistors; and a third bridge circuit on the first face of the beam, the third bridge circuit comprising e compression gauge resistors; wherein a tension gauge resistor from each of the first and second bridge circuits and a compression gauge resistor from the third bridge circuit are at the proximal end portion of the beam; and wherein a tension gauge resistor from each of the first and second bridge circuits and a compression gauge resistor from the third bridge circuit are at the distal end portion of the beam.
 51. The force sensor of claim 50, wherein: the tension gauge resistor of the first bridge circuit at the proximal end portion of the beam is co-located on the beam with the tension gauge resistor from the second bridge circuit at the proximal end portion of the beam; and the tension gauge resistor of the first, bridge circuit at the distal end portion of the beam is co-located with the tension gauge resistor from the second bridge circuit at the distal end portion of the beam.
 52. The force sensor of claim 50, wherein: the compression gauge resistor from the third bridge at the proximal end portion of the beam is between the tension gauge resistors from each of the first and second bridge circuits at the proximal end portion of the beam; and the compression gauge resistor from the third bridge at the distal end portion of the beam is between the tension gauge resistors from each of the first and second bridge circuits at the distal end portion of the beam.
 53. The force sensor of claim 50 embodied in a surgical instrument. 